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Abstract
We propose a nested Gaussian process (nGP) as a locally adaptive prior for Bayesian nonparametric regression. Specified through a set of stochastic differential equations (SDEs), the nGP imposes a Gaussian process prior for the function’s mth-order derivative. The nesting comes in through including a local instantaneous mean function, which is drawn from another Gaussian process inducing adaptivity to locally varying smoothness. We discuss the support of the nGP prior in terms of the closure of a reproducing kernel Hilbert space, and consider theoretical properties of the posterior. The posterior mean under the nGP prior is shown to be equivalent to the minimizer of a nested penalized sum-of-squares involving penalties for both the global and local roughness of the function. Using highly efficient Markov chain Monte Carlo for posterior inference, the proposed method performs well in simulation studies compared to several alternatives, and is scalable to massive data, illustrated through a proteomics application.
Acknowledgments
This work was supported by Award Numbers R01ES017436 and R01ES17240 from the National Institute of Environmental Health Sciences, by funding from the National Institutes of Health (5P2O-RR020782-O3) and the U.S. Environmental Protection Agency (RD-83329301-0) and by the Intramural Research Program of the National Cancer Institute, National Institutes of Health, Maryland, USA. The content is solely the responsibility of the authors and does not necessarily represent the official views of the National Institute of Environmental Health Sciences, the National Institutes of Health or the U.S. Environmental Protection Agency.